Stability of the centers of the symplectic groups rings Z[Sp2n(q)]

Abstract

We investigate the structure constants of the center Hn of the group algebra Spn(q) over a finite field. The reflection length on the group GL2n(q) induces a filtration on the algebras Hn. We prove that the structure constants of the associated filtered algebra Sn are independent of n. As a technical tool in the proof, we determine the growth of the centralizers under the embedding Spm(q)⊂ Spm+l(q) and we show that the index of the centralizer of g∈ Spm(q) in the centralizer of g∈ Spm+k is equal to q2ld|Spr+l(q)||Spr(q)|-1 for some d and r which are uniquely determined by the conjugacy class of g in GL2n(q).